Kibble-Zurek dynamics in the anisotropic Ising model of the Si(001) surface
Gernot Schaller, Friedemann Queisser, Seyedeh Parya Katoorani, Christian Brand, Christian Kohlf\"urst, Mark R. Freeman, Alfred Hucht, Peter Kratzer, Bj\"orn Sothmann, Michael Horn-von Hoegen, Ralf Sch\"utzhold
TL;DR
This paper investigates the non-equilibrium dynamics of the anisotropic 2D Ising model on Si(001) surfaces during cooling, revealing a crossover from 1D to 2D behavior and confirming Kibble-Zurek scaling.
Contribution
It provides an exact analytic solution for rapid cooling in the anisotropic Ising model and demonstrates the crossover to 2D Kibble-Zurek scaling at slower cooling rates.
Findings
Exact solution for rapid cooling dynamics
Crossover from 1D to 2D behavior observed
Confirmation of Kibble-Zurek scaling in 2D
Abstract
As a simplified description of the non-equilibrium dynamics of buckled dimers on the Si(001) surface, we consider the anisotropic 2D Ising model and study the freezing of spatial correlations during a cooling quench across the critical point. Depending on the cooling rate, we observe a crossover from 1D to 2D behavior. For rapid cooling, we find effectively 1D behavior in the strongly coupled direction, for which we provide an exact analytic solution of the non-equilibrium dynamics. For slower cooling rates, we start to see 2D behavior where our numerical simulations show an approach to the usual Kibble-Zurek scaling in 2D.
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Taxonomy
TopicsTheoretical and Computational Physics · Advanced Thermodynamics and Statistical Mechanics · Quantum many-body systems